I think an (inefficient) recursive procedure for Matrix chain multiplication problem can be this (based on recurrence relation given in Cormen):
MATRIX-CHAIN(i,j) if i == j return 0 if i < j q = INF for k = i to j-1 q = min (q, MATRIX-CHAIN(i,k) + MATRIX-CHAIN(k+1, j) + c) //c = cost of multiplying two sub-matrices. return q
Time complexity for this will be:
T(n) = summation over k varying from i to j [T(k) + T(n-k)]
Here, n = number of matrices to be multiplied.
What will be the value of T(n) and how?